11Number and algebra,Measurement and geometry
Ratios, ratesand timeRatios and rates are used in many everyday situations to comparethings. Ratios are used when baking cakes and cooking meals,mixing fertiliser, reading maps and house plans. Rates are used whencalculating the price of phone calls, measuring household electricityusage and calculating the speed of a car.
n Chapter outlineProficiency strands
11-01 Equivalent ratios U C11-02 Simplifying ratios U F11-03 Ratio problems U F PS C11-04 Scale maps and plans U F PS C11-05 Dividing a quantity in a
given ratio U F11-06 Rates U C11-07 Best buys U F PS R C11-08 Rate problems U F PS C11-09 Speed U F PS C11-10 Travel graphs U F PS R C11-11 Sketching informal
graphs U F PS R C11-12 Time differences U F PS C11-13 International time
zonesU F PS C
n Wordbankbest buy When comparing different brands or sizes duringshopping, this is the item with the lowest unit cost and isthe best value for money
per (symbol ‘/’) A word used in rates to mean ‘for each’
scaled length A length on a map or plan that represents anactual length, usually much smaller but in proportion to it
speed A rate that compares distance travelled with time taken
time zone A region of the world where all placesexperience the same time of day
travel graph A line graph that describes a journey andshows distance travelled over time
unit cost The price of one item or unit, such as 1 mL or 1 g
unitary method A method of finding a quantity by findingone part first
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n In this chapter you will:• recognise and solve problems involving simple ratios• divide a quantity in a given ratio• solve a range of problems involving rates and ratios, with and without digital technologies• convert given information into rates• investigate and calculate ‘best buys’• use travel graphs to investigate and compare the distance travelled to and from school• interpret features of travel graphs such as the slope of lines and the meaning of horizontal lines• investigate, interpret and analyse graphs from authentic data• sketch informal graphs to model familiar events, for example, noise level during the lesson• solve problems involving duration, including using 12- and 24-hour time within a single time zone• solve problems involving international time zones
SkillCheck
1 Copy and complete.
a 2 m ¼ _____cm b 3 h ¼ _____min c 3000 kg ¼ _____td 2.5 L ¼ _____mL e 380 cm ¼ _____m f 180 mg ¼ _____gg 3 min ¼ _____s h 8.5 cm ¼ _____mm i 480 min ¼ _____hj 7500 mL ¼ _____L k 9.15 km ¼ _____m l 3840 mm ¼ _____cm
2 Find the greatest common divisor (GCD) of each pair of numbers.
a 12 and 18 b 35 and 21 c 16 and 40
3 Complete each pair of equivalent fractions.
a 710¼ �
30b 3
5¼ 12�
c 1845¼ �
5
4 Find the lowest common multiple (LCM) of each pair of numbers.
a 2 and 3 b 4 and 8 c 5 and 3
5 Simplify each fraction.
a 1845
b 3264
c 80100
d 1536
6 Evaluate each expression.
a 25
3 20 b 13
3 15 c 34
3 24 d 56
3 36
e 7.6 3 100 f 5.4 3 10 g 0.39 3 100 h 25 3 10
7 Convert each time to 24-hour time.
a 7:15 a.m. b 3:45 p.m. c 8:50 p.m. d 12:10 a.m.
8 Convert each time to 12-hour time.
a 0410 b 1105 c 1415 d 2335
Maths clip
Why do we haveratios?
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Worksheet
StartUp assignment 11
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24-hour time
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11-01 Equivalent ratiosA ratio consists of two or more numbers that compare the parts or shares of things of the sametype, in the same units. For example, if a cake recipe uses sugar to flour in a ratio of 1 to 2,written ‘1 : 2,’ it means that for every one part of sugar we need two parts of flour.Each number in a ratio is called a term of the ratio.Equivalent ratios are equal ratios and can be found in a similar way to that used for findingequivalent fractions.
Summary
To find an equivalent ratio, multiply or divide each term by the same number.
Example 1
Complete each pair of equivalent ratios.
a 2 : 7 ¼ _____ : 35 b 6 : 5 ¼ 18 : _____ c 12 : 8 ¼ 3: _____
Solutiona To find the missing term, look at the two
known matching terms, 7 and 35.
7 is multiplied by 5 to give 35, so do thesame thing to the 2.2 3 5 ¼ 10
b The two known matching terms are 6and 18.
6 is multiplied by 3 to give 18, so do thesame thing to the 5.5 3 3 ¼ 15
c The two known matching terms are 12and 3.
12 is divided by 4 to give 3, so do thesame thing to the 8.8 4 4 ¼ 2
Exercise 11-01 Equivalent ratios1 For each shape:
i write the ratio of shaded to unshaded parts
ii write an equivalent ratio to the ratio from i
2 : 7 = 10 : 35
× 5
× 5
6 : 5 = 18 : 15
× 3
× 3
12 : 8 = 3 : 2
÷ 4
÷ 4
Puzzle sheet
Simplifying ratios
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cba
ed
2 Copy and complete each pair of equivalent ratios.
a 2 : 3 ¼ 8 : ____ b 1 : 5 ¼ 2 : ____ c 3 : 5 ¼ ____ : 15d 4 : 7 ¼ ____ : 35 e 5 : 8 ¼ 20 : ____ f 7 : 12 ¼ 49 : ____g 5 : 11 ¼ ____ : 66 h 3 : 4 ¼ ____ : 100 i 2 : 1 ¼ 10 : ____j ____ : 9 ¼ 20 : 36 k 12 : ____ ¼ 3 : 1 l 17 : 34 ¼ ____ : 2m ____ : 45 ¼ 6 : 9 n 24 : 12 ¼ 4 : ____ o 16 : ____ ¼ 2 : 5p ____ : 20 ¼ 15 : 60 q 24 : 20 ¼ 6 : ____ r 50 : 40 ¼ ____ : 20
3 Which of the following ratios is not equivalent to the ratio 32 : 48? Select the correct answerA, B, C or D.
A 16 : 24 B 4 : 6 C 2 : 3 D 6 : 8
4 Which pair of ratios are not equivalent? Select the correct answer A, B, C or D.
A 12 : 21, 4 : 6 B 15 : 10, 35 : 20 C 32 : 8, 6 : 1 D 48 : 60, 4 : 5
5 Copy and complete each pair of equivalent ratios.
a 2 : 3 : 4 ¼ 6 : ____ : ____ b 3 : 4 : 5 ¼ ____ : 20 : ____ c 0.1 : 0.3 ¼ 0.5 : ____
d 0.7 : 0.4 ¼ ____ : 2 e ____ : 4.5 ¼ 7.8 : 13.5 f 23¼
9
g 78¼ 21 h 7
20¼
100i 5
3¼ 25
j 12
: 3 ¼ : 9 k 9 :37¼ : 3
11-02 Simplifying ratios
Summary
• To simplify a ratio, keep dividing both terms by the same number, preferably a large numbersuch as their greatest common divisor (GCD), until each term is as small as possible
• If all terms are even, divide by 2 or perhaps 4• Otherwise, try dividing by the odd numbers 3, 5 or 7
See Example 1
Worked solutions
Exercise 11-01
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Simplifying ratios
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Example 2
Simplify each ratio.
a 25 : 40 b 24 : 16 c 18 : 30 : 15
Solution
a 25 : 40 ¼ 255
: 405
¼ 5 : 8
Divide both terms by their GCD, 5.
OR enter 25 : 40 as a fraction 2540
on the calculator:25 ab/c 40 =
b 24 : 16 ¼ 248
: 168
¼ 3 : 2
Divide both terms by their GCD, 8.
OR enter 24 : 16 as an improper fraction 2416
on the calculator: 24 ab/c 16 =
Then to change the mixed numeral answer to an
improper fraction, press: d/c ( )2ndF
SHIFTab/c
c 18 : 30 : 15 ¼ 183
: 303
: 153
¼ 6 : 10 : 5
Divide all terms by their GCD, 3.
Example 3
Simplify each ratio.
a 35
:13
b 0.7 : 0.05
SolutionIf a ratio has terms that are fractions or decimals, it can be simplified by converting the termsto whole numbers.a For fractions, multiply both terms by a common multiple, preferably the lowest
common multiple (LCM) of the denominators.
35
: 13¼ 3
53 15 : 1
33 15
¼ 9 : 5
LCM of 5 and 3 is 15.
b For decimals, multiply both terms by the appropriate power of ten. In this case,multiply by 100 (move the decimal place two places to the right).
0:7 : 0:05 ¼ 0:7 3 100 : 0:05 3 100
¼ 70 : 5
¼ 14 : 1 Simplifying.
On some calculators, use thekey instead of ab/c
On some calculators, press
( )SHIFT S D⇔b da c c⇔
Because there are more than 2terms in this ratio, thecalculator cannot be used here
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Example 4
Simplify the ratio of 2 hours to 1 day.
SolutionFirst, change the values to the same units. 1 day ¼ 24 hours
2 hours : 1 day ¼ 2 hours : 24 hours
¼ 2 : 24
¼ 1 : 12
Exercise 11-02 Simplifying ratios1 Simplify each ratio.
a 10 : 100 b 12 : 24 c 12 : 30 d 35 : 49e 18 : 12 f 56 : 24 g 1000 : 100 h 45 : 99i 87 : 87 j 123 : 321 k 51 : 17 l 3 : 48m 8 : 12 : 20 n 15 : 20 : 30 o 27 : 9 : 36 p 14 : 35 : 21 : 49
2 Simplify each ratio.
a 13
: 25
b 14
: 13
c 34
: 23
d 12
: 38
e 25
: 310
f 45
: 12
g 58
: 14
h 23
: 12
i 34
: 716
j 45
: 12
k 56
: 25
l 65
: 23
m 0.4 : 0.7 n 1.3 : 0.8 o 0.5 : 0.3 p 0.9 : 1.8q 0.6 : 0.8 r 3.6 : 2.4 s 0.05 : 0.2 t 0.25 : 0.5u 0.375 : 0.25 v 12 : 8.4 w 2.4 : 1.2 : 3.6 x 4.5 : 1 : 0.9
3 Simplify each ratio.
a 50 cm to 2 m b 300 g to 1.2 kg c 5 days to 7 weeksd 30 min to 2 hours e 70 cents to $2.10 f 2 years to 6 monthsg 15 hours to 2 days h 20 mm to 1 m i 4 tonnes to 350 kgj 25 min to 3 hours k 18 m to 1 km l 8 months to 4 yearsm 2 days to 8 hours n 75 cents to $5 o $2.70 : $12
4 On a farm there are 200 orange and mandarin trees intotal. If there are 120 orange trees, what is the ratio oforange to mandarin trees?
5 In a class of 28 students, there are 16 girls. Find the ratio of:
a girls to boys b boys to girls c girls to students in the class
See Example 2
See Example 3
See Example 4
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6 A store has 30 gas heaters and 20 electric heaters in its warehouse. Find the ratio of:
a gas heaters to electric heaters b gas heaters to all heatersc all heaters to electric heaters
7 A man earns $75 000 a year and spends $64 000 a year. Find the ratio of:
a his earnings to expenses b his savings to earnings
8 Zoe buys goods for $320 and sells them for $380. Find the ratio of:
a the cost price to the selling price b the selling price to the cost pricec the profit to the selling price d the selling price to the profit
9 The line below is divided into units of length as shown.
A B C
Find each ratio of lengths.
a AB : BC b AC : AB c BC : AC d AC : BC
10 A vending machine is filled with bottles and cans. The ratio of the number of bottles to thetotal number of contents is 3 : 8.a What fraction of the contents are cans?
b What is the ratio of the number of cans to the number of bottles?
11 0.5 m3 of cement is added to 38 m3 of metal to make a mixture. What is the ratio of cement to
metal? Select the correct answer A, B, C or D.
A 4 : 3 B 7 : 8 C 3 : 4 D 3 : 16
12 When comparing the rate at which babies are born in different countries (that have differentpopulation sizes), we use a base number of 1000. The annual birth rate in Australia isapproximately 12 per 1000 people (a ratio of 12 : 1000). The rate in India is approximately22 per 1000 people, or 22 : 1000. Express each ratio in simplest form.
11-03 Ratio problemsProblems involving ratios can be solved using equivalent ratios or the unitary method. With theunitary method, we find the size of one part first.
Example 5
In an English class the ratio of boys to girls is 5 : 6. If there are 15 boys in the class, howmany girls are there?
SolutionMethod 1: Equivalent ratiosWrite the problem as a pair of equivalent ratios.
Boys : girls ¼ 5 : 6 = 15 :
× 3
× 3
15 boys
Worked solutions
Exercise 11-02
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Ratio applications
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Homework sheet
Ratios 1
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Number of girls ¼ 6 3 3 ¼ 18There are 18 girls in the class.
Method 2: Unitary methodBoys : girls ¼ 5 : 65 parts (boys) ¼ 151 part ¼ 15 4 5 ¼ 36 parts (girls) ¼ 6 3 3 ¼ 18There are 18 girls in the class.
Finding one part first.
Example 6
To make concrete, a builder mixes sandand cement in the ratio 5 : 4. If a mix ofconcrete contains 20 kg of cement, find:a the amount of sand in the mixb the total mass of the mix.
Solutiona Method 1: Equivalent ratios
Sand : cement ¼ 5 : 4 = : 20
× 5
× 5Amount of sand ¼ 5 3 5 ¼ 25 kg
20 kg of cement.
Method 2: Unitary methodSand : cement ¼ 5 : 44 parts (cement) ¼ 20 kg1 part ¼ 20 4 4 ¼ 5 kg5 parts (sand) ¼ 5 3 5 ¼ 25 kg
b Total mass ¼ 20 kg þ 25 kg ¼ 45 kgSo the total mixture was 45 kg.
Cement and sand.
‘Unitary’ means ‘one’
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Exercise 11-03 Ratio problems1 Alison and Elena buy a length of material and divide it between them in the ratio 2 : 3. If Alison
has 3.6 m, what length of material does Elena have? Select the correct answer A, B, C or D.
A 1.8 m B 2.4 m C 5.4 m D 9 m
2 A tiler uses 4 green tiles to every 3 white ones. How many white tiles are used if 100 green tilesare used?
3 When making concrete, sand and cement are mixed in the ratio 4 : 1. If 140 kg of cement hasbeen delivered, what mass of sand is needed?
4 Two lengths of timber are in the ratio 4 : 7. The longer length is 56 cm. What is the shorter length?
5 In a school, the ratio of teachers to students is 1 : 18. If the college has 80 teachers, how manystudents are there?
6 The speed of two boats is in the ratio 7 : 4. The speed of theslower boat is 10 km/h. Find the speed of the faster boat.
7 In a rectangle, the ratio of the width to the length is 5 : 12. The length is 48 cm.
a Find the width of the rectangle. b Find the perimeter of the rectangle.
8 An alloy contains copper and iron in the ratio 2 : 5. A quantity of alloy contains 20 kg of iron.What mass of copper does it contain?
9 Ali, Bree and Felicity share a Lotto prize in the ratio 10 : 8 : 7. If Bree received $72,
a how much did the other two receive? b what was the total prize money shared?
10 In a triangle, the lengths of the sides are in the ratio 3 : 4 : 5. If the longest side is 30 cm long,find the perimeter of the triangle.
11 The masses of two packets of detergent are in the ratio 3 : 10.a If the lighter packet has a mass of 1.5 kg, what is the mass of the larger one?
b If the heavier packet costs $12.50 and the lighter packet costs $3.90, which packet is thecheaper per kilogram and by how much?
12 Enzo’s Produce Store buys fruit and vegetables in theratio 5 : 7. The mass of fruit ordered is 8.5 tonnes.What is the total mass of produce ordered?
13 Simon and Joshua’s heights are in the ratio 8 : 9. If Joshua is 1.71 m tall, how tall is Simon?
14 In an outback mining town, the ratio of women to men is 2 : 5. If there are 240 women, howmany men and women are there in the town altogether? Select A, B, C or D.
A 840 B 600 C 96 D 1680
See Example 5
See Example 6
Worked solutions
Exercise 11-03
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15 To make Superglue, the contents of Tube A and Tube B are mixed in the ratio 3 : 1.a If 15 mL of Tube A is used, how much of Tube B is needed?
b How much glue is made altogether if 15 mL of Tube B is used?
Just for the record The golden ratioAncient Greek mathematicians and artists discovered a ‘perfect’ rectangle where the ratio ofits length to width followed this rule:
lengthwidth
¼ lengthþ widthlength
:
The exact value of the ratio is the surdffiffiffi
5p� 1
2, which is equal to 1.618033989 … This ratio is
called the golden ratio and a rectangle with these dimensions is called a golden rectangle.The ancient Greeks used the golden ratio in art and architecture. Many buildings used goldenrectangles as it was thought to be the most pleasing of all rectangles.The Parthenon in Athens was built to the dimensions of the Golden Rectangle.
The golden ratio also appears in nature, such as in the contours of Nautilus shells.1 Find another application of the golden ratio or golden rectangle.2 Find the special relationship between the golden ratio and its reciprocal.
11-04 Scale maps and plansScale maps and plans are a special application of ratios used to represent real locations and buildings.Lengths and distances on the scale diagrams are in the same ratio as the real lengths and distances.
Summary
The scale ratio on a scale diagram is written in the formScaled length : real length
where scaled length is the length on the diagram.
For example, a scale ratio of 1 : 100 means that the real lengths are 100 times larger than thelengths on the diagram.
Worked solutions
Exercise 11-03
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Map scalesMap scales are often expressed in the same form as ratios. A scale of 1 cm : 1 km means that 1 cmon the map represents an actual distance of 1 km.
Example 7
Simplify each map scale.
a 1 cm : 1 km b 0 2 4 6 8 10km
Solutiona 1 cm : 1 km ¼ 1 cm : 1000 m 1 km ¼ 1000 m
¼ 1 cm : 100 000 cm
¼ 1 : 100 000
1 m ¼ 100 cm
b The length of the segment from 0 to 10 on the diagram is 5 cm.
So 5 cm on the map represents 10 km of actual distance.
Scale ¼ 5 cm : 10 km
¼ 5 cm : 10 3 1000 3 100 cm Convert 10 km to cm.
¼ 5 cm : 1 000 000 cm
¼ 1 : 200 000 Simplifying the ratio.
Example 8
A map has a scale of 1 : 25 000.
a What is the actual distance if the scaled distance is 4 cm?b What is the scaled distance if the actual distance is 3.5 km?
Solutiona Scaled distance ¼ 4 cm
Actual distance ¼ 4 3 25 000 cm
¼ 100 000 cm
¼ 1000 m 1 m ¼ 100 cm
¼ 1 km 1 km ¼ 1000 m
b Actual distance ¼ 3.5 km
¼ 3500 m 1 km ¼ 1000 m
¼ 350 000 cm 1 m ¼ 100 cm
Scaled distance ¼ 350 000 cm 4 25 000
¼ 14 cm
Worksheet
Map of Adelaide
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Scale plans
Scaled distance Actual distance
Multiply
Divide
Example 9
This diagram of a clock is drawn to a scale of 1 : 6. Measure its length and calculate its actuallength.
Scale 1 : 6
XIII
II
III
IV
VVIVII
VIII
IX
X
XI
SolutionScaled length ¼ 5 cm by measurement
Actual length ¼ 5 cm 3 6
¼ 30 cm
Example 10
This drawing of a screw is drawn to a scale of 5 : 1. Find its actual length.
Scale 5 : 1
SolutionA scale of 5 : 1 means that the real screw is five times smaller than the one drawn.Scaled length ¼ 4 cm by measurement
Actual length ¼ 4 cm 4 5
¼ 0:8 cm
Worksheet
Scale drawings
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Exercise 11-04 Scale maps and plans1 Simplify each map scale.
a 1 cm : 5 km b 1 mm : 1 m c 1 cm : 500 km d 1 cm : 25 km
fe
g
h
i
j
0 100 200 300metres
0 1 2 3 4 5kilometres
0 500 1000 1500metres
0 1 2 3km
0 1 2 3 4km
0 150 300 450 600 750metres
2 A map has a scale of 1 : 50 000. Which of the following distances in kilometres is representedby 64 mm on the map? Select the correct answer A, B, C or D.
A 0.32 km B 3.2 km C 32 km D 320 km
3 A street directory uses a scale of 1 cm : 200 m.a Simplify this ratio.
b Find the actual distance, in kilometres, represented by each scaled distance.
i 7 cm ii 9.5 cm iii 12.4 cm
c Find the scaled distance, in centimetres, used to represent each actual distance.
i 18 km ii 1500 m iii 9.6 km
4 On a map using a scale of 1 : 10 000 000, the Nile (world’s longest river) would be the lengthof an average shoe lace (about 66.7 cm). How many kilometres long is the Nile River?
5 The town of Gilgandra is 66 km north of Dubbo. On a map with a scale of 1 : 100 000, whatis the scaled distance between the two towns?
6 Lord Howe Island is 2.8 km wide. How long would its scaled width be on a map with a scaleof 1 : 50 000?
7 This map of Nambucca Heads has a scale of 1 : 40 000.
N
Post Office
WaterTowers
PoliceStn
Catholic Church
Anglican Church
ForeshoreCaravan Park
Causeway
Island GolfCourse
Lagoon
ShelleyBeach Lookout
RotaryLookout
CoronationPark
Cemetery
1
2
3
4
5
6
7
8A B C D E F G H I J
WES
T
STRE
ET
PIGGOTT ST
NAMBUCCA
STATE
FOREST
SOU
TH
P
AC
IFIC
OC
EA
N
NAMBUCCA
HEADS
See Example 7
See Example 8
Worked solutions
Exercise 11-04
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a Find the distance between:i the Water Towers (C2) and the Catholic Church (F3)
ii the Anglican Church (G4) and Coronation Park (I4)
iii Rotary Lookout (H6) and Shelley Beach Lookout (J6)
iv the post office (F4) and the Foreshore Caravan Park
b Find the length of:
i West Street (E4) ii Piggott Street (D5)
c How long is the lagoon (I7)?
d What are the dimensions of the cemetery (J2)?
e How long is the causeway leading to the Island Golf Course (B7)?
f To train for a fun run, Tegan decides to run 8 km three times a week. What distance willthis be on the map? Outline a possible course for her training run, starting and finishing atthe Foreshore Caravan Park (D6).
8 This is a scale plan of a bedroom.
Scale 1 : 50By measurement and calculation, find the actual:
a length of the bedroom b width of the doorwayc length of the bed d length of the windowe length of the table f area of the bedroom
9 Measure the length of each scaled-down image below, then use the scale ratio to calculate itsactual length.
ba Fish 1 : 3 House1 : 300
Length
Len
gth
See Example 9
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Length
Length
dc Pen 1 : 4 Tennis racquet 1 : 16
10 An electronics engineer designs a mobile phone SIM card using a diagram with a scale of100 : 1. If the scaled drawing is 80 cm long, what is its actual length in millimetres? Select thecorrect answer A, B, C or D.
A 80 B 8 C 0.8 D 0.08
11 This house plan is drawn to a scale of 1 : 100.
Scale 1 : 100
SecondBedroom
MainBedroom
Hall
DiningLounge
Bath
LaundryWC
Kitchen
Measure and calculate:
a the length of the main bedroom b the length of the window in that roomc the length of the laundry d the area of the bathroome the longer side of the lounge room f the area of the dining room
See Example 10
Worked solutions
Exercise 11-04
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12 Measure the length of each magnified image below, then use the scale ratio to calculate itsactual length.
Length
ba
dc
Flea 100 : 1 Microchip 3 : 1
Nut 4 : 3 Bacterium 100 : 1
Length
Length
Length
Mental skills 11 Maths without calculators
24-hour time
24-hour time 12-hour time 24-hour time 12-hour time0000 12:00 a.m. (midnight) 1200 12:00 p.m. (midday)0100 1:00 a.m. 1300 1:00 p.m.0200 2:00 a.m. 1400 2:00 p.m.0300 3:00 a.m. 1500 3:00 p.m.0400 4:00 a.m. 1600 4:00 p.m.0500 5:00 a.m. 1700 5:00 p.m.0600 6:00 a.m. 1800 6:00 p.m.0700 7:00 a.m. 1900 7:00 p.m.0800 8:00 a.m. 2000 8:00 p.m.
Investigation: Scale drawings
1 Measure the dimensions of your bedroom and the dimensions of the items of furniture in it.2 Using a scale of 1 : 100, draw a scale diagram of your bedroom on graph paper.3 Draw scale diagrams of each piece of furniture on another piece of graph paper, then cut
them out.4 Rearrange the furniture in your bedroom on the scale diagram to see which arrangement
you prefer best.
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24-hour time 12-hour time 24-hour time 12-hour time0900 9:00 a.m. 2100 9:00 p.m.1000 10:00 a.m. 2200 10:00 p.m.1100 11:00 a.m. 2300 11:00 p.m.
To convert from 24-hour time to 12-hour time:
• if it begins with ‘00’, then it is the 12:00 a.m. (midnight) hour• if it begins with ‘12’, then it is the 12:00 p.m. (midday) hour• if it is less than 1200, then it is a.m. (morning)• if it is 1300 or more, then it is p.m. (afternoon/evening) time: subtract 12 from the hour.
1 Study each example.a Convert 1850 to 12-hour time.
1800 > 1300, so it is p.m. time, so subtract 12 from the hour.18 � 12 ¼ 61850 ¼ 6:50 p.m.
b Convert 0430 to 12-hour time.0430 < 1200, so it is a.m. time.0430 ¼ 4:30 a.m.
c Convert 0015 to 12-hour time.0015 begins with 00, so it is 12:00 a.m. time0015 ¼ 12:15 a.m.
2 Now convert each time to 12-hour time.a 0845 b 1320 c 1750 d 0017e 2105 f 1832 g 1115 h 0238i 1440 j 0320 k 1655 l 2331m 0108 n 1018 o 2000 p 0643
To convert from 12-hour time to 24-hour time:
• if it is the 12:00 a.m. (midnight) hour, begin with ‘00’• if it is ‘a.m.’ time or the 12:00 p.m. (midday) hour, write as is but make sure the hour has
two digits (for example, 02, 09).• if it is 1:00 p.m. or later, then add 12 to the hour.
3 Study each example.a Convert 4:10 a.m. to 24-hour time.
It is ‘a.m.’ time, so write as a 4-digit number and rename 4 as 04.4:10 a.m. ¼ 0410
b Convert 4:10 p.m. to 24-hour time.It is after 1 p.m., so add 12 to the hour: 4 þ 12 ¼ 164:10 p.m. ¼ 1610
c Convert 12:47 a.m. to 24-hour time.It is in the 12:00 a.m. (midnight) hour, so change the 12 to 00.12:47 a.m. ¼ 0047
4 Now convert each time to 24-hour time.a 6:35 p.m. b 8:05 a.m. c 11:45 a.m. d 11:20 p.m.e 2:21 a.m. f 12:30 p.m. g 3:48 p.m. h 7:11 p.m.i 9:08 a.m. j 9:50 p.m. k 12:42 a.m. l 7:39 a.m.m 1:59 a.m. n 10:18 p.m. o 10:46 a.m. p 5:23 p.m.
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11-05 Dividing a quantity in a given ratioElyse and Henry won a cash prize of $420 for winning an art competition but instead of dividingthe money evenly ($210 each), they decide to divide it in the ratio 3 : 4, so that Elyse receives 3parts while Henry receives 4 parts. Henry receives more because he did more of the work and paidmore when buying the materials for the artwork.Problems involving dividing a quantity in a given ratio can be solved using the unitary method orfraction method.
Example 11
Divide a cash prize of $420 between Elyse and Henry in the ratio 3 : 4.
Solution
Method 1: Unitary method Method 2: Fraction methodTotal number of parts ¼ 3 þ 4 ¼ 7
7 parts ¼ $4201 part ¼ $420 4 7
¼ $60Elyse’s share 3 partsð Þ ¼ 3 3 $60
¼ $180Henry’s share 4 partsð Þ ¼ 4 3 $60
¼ $240
Total number of parts ¼ 3 þ 4 ¼ 7
Elyse’s share (3 parts) ¼ 37
3 $420
¼ $180
Henry’s share (4 parts) ¼ 47
3 $420
¼ $240
[ Elyse receives $180 and Henryreceives $240.
Check: $180 þ $240 ¼ $420
Example 12
Nick, Ian and Rob agreed to divide the profits of their removalist business in the ratio 2 : 3 : 5.If their profit this year was $45 000, find the size of each person’s share of the profits.
Solution
Method 1: Unitary method Method 2: Fraction methodTotal number of parts ¼ 2 þ 3 þ 5 ¼ 10
10 parts ¼ $45 0001 part ¼ $45 000 4 10
¼ $4500Nick’s share ¼ 2 3 $4500
¼ $9000Ian’s share ¼ 3 3 $4500
¼ $13 500
Total number of parts ¼ 2 þ 3 þ 5 ¼ 10
Nick’s share ¼ 210
3 $45 000
¼ $9000
Ian’s share ¼ 310
3 $45 000
¼ $13 500
Rob’s share ¼ 510
3 $45 000
¼ $22 500
Homework sheet
Ratios 2
MAT08NAHS10013
Video tutorial
Dividing a quantity in agiven ratio
MAT08NAVT10020
Animated example
Shares in ratios
MAT08NAAE00011
Technology worksheet
Excel: Applying ratios
MAT08NACT00009
Technology
Excel: Applying ratios
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Rob’s share ¼ 5 3 $4500
¼ $22 500[ Nick, Ian and Rob receive $9000,$13 500 and $22 500 respectively.
Check: $9000 þ $13 500 þ $22 500 ¼$45 000
Exercise 11-05 Dividing a quantity in a given ratio1 Find the total number of parts if the ratio is:
a 2 : 7 b 4 : 1 c 3 : 4 d 2 : 5 : 6
2 Divide $500 in the ratio:
a 4 : 1 b 7 : 3
3 Phuong, Janelle and Ahmet bought a Lotto ticket for $12. They contributed $3, $3 and $6respectively to the purchase price. They won $4000 and agree to split the winnings in the same ratio.a Simplify the ratio 3 : 3 : 6.
b How much prize money does each person get?
4 Brad and Angelina share the weekly rent of $450 in the ratio 3 : 2. What is Angelina’s share?
5 Divide 450 kg in the ratio:a 4 : 5 b 3 : 2
6 Divide 720 cm in the ratio:a 1 : 3 : 5 b 5 : 3 : 4
7 Company directors Judy, Gas and Robert share the company profits in the ratio 5 : 3 : 3.Which of the following is the amount that Judy receives in a year when profits are $121 000?Select the correct answer A, B, C or D.
A $11 000 B $24 000 C $33 000 D $55 000
8 In Year 8, the ratio of boys to girls is 4 : 5. If there are 225 students in Year 8, find how manygirls there are.
9 In Year 9, the ratio of boys to girls is 3 : 2. If there are 125 students in Year 9, find how manymore boys there are than girls.
10 Adam needs to make 800 g of short-crust pastry. Flour and butter are needed in the ratio 3 : 1.How much flour is needed?
See Example 11
See Example 12
Worked solutions
Exercise 11-05
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11 A company posts 1386 letters in a week. The ratio of local to overseas letters is 2 : 7. Howmany overseas letters are sent in a week?
12 A truck carries fruit and vegetable boxes in the ratio 5 : 7. If it carries a total mass of 7.5tonnes, what mass of vegetables does it carry?
13 An alloy of mass 176 kg is made from copper and zinc in the ratio 5 : 6. Find the mass ofcopper in the alloy.
14 At a school, the ratio of students who speak a second language to students who speak onlyEnglish is 5 : 8. If there are 923 students at the school, how many students speak only English?
15 A 20 m cable is cut into three sections in the ratio 2 : 3 : 5. Find the length of each section.
16 When making mortar, sand and concrete is mixed in the ratio 6 : 1. If we need 280 kg ofmortar, how much sand will we need?
17 In a study of 225 000 people, it was found that the ratio of right-handed people to left-handedpeople was 13 : 2.a How many left-handed people were there?
b How many more right-handed people than left-handed people were there?
18 Angus earns twice as much as Catriona. If the sum of their wages is $210 000, how much doeseach earn?
11-06 RatesWhile a ratio compares two or more quantities measured in the same units, a rate compares twoquantities measured in different units.A rate shows how one quantity changes with another quantity. We write a rate using a ‘/’ symbolin the form ‘something per something else’. For example:
• the price of petrol is stated in cents per litre, or c/L• your heart beats at a rate measured in beats per minute, or beats/min• the speed of a car is measured in kilometres per hour, or km/h.
The word ‘per’ means ‘for each’ so we express a rate ‘per single unit’. For instance, travelling at arate of 50 km/h means travelling 50 km in each hour.
Example 13
Write each statement as a simplified rate.a A factory produces 87 cars in 3 hoursb Ham costs $50 for 8 kg
Solutiona The production rate would be expressed in cars per hour.
Production rate ¼ 87 cars3 hours
¼ 29 cars/hour
Worked solutions
Exercise 11-05
MAT08NAWS10081
Worksheet
Rates
MAT08NAWK00044
We can write a rate as afraction: divide the number ofcars by the number of hours
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b The cost would be expressed in dollars per kilogram.
Cost ¼ $508 kg
¼ $6:25=kg
Exercise 11-06 Rates1 Write the units suitable for each rate below, in the form _____/_____.
a typing speed b heartbeat ratec cost of a mobile phone call d cost of bananase a person’s wage f cost of petrolg population growth h the cost of wateri population density
2 Write each statement as a simplified rate.
a 51 sheep in 3 hours b $10.75 for 2.5 kgc 208 students for 8 teachers d 136 points in 4 gamese 546 words in 6 minutes f 34 articles in 4 hoursg 72 cars in 14 days h 5040 boxes in 8 hoursi 259 metres in 7 seconds j 46 000 bottles in 50 hoursk 7944 revolutions in 6 minutes l $175 for 5 hoursm 448 km in 8 hours n $16.50 for 6 kgo 114 runs in 24 overs p 243 km using 30 litresq $126 for 12 hours r 2520 kg for 60 hectares
3 The cost of sending a 5.5 kg parcel to Malaysia is $88. What is the postage rate? Select thecorrect answer A, B, C or D.
A $0.34/kg B $16/kg C $0.07/kg D $484/kg
4 In your own words, explain what is meant by each rate.
a a speed of 100 km/hb a traffic flow of 150 cars/hc petrol consumption of 10.3 L/100 kmd a farmer keeping 60 sheep/hectare
5 A lift should carry no more than 1600 kg or 20 people. What is this weight allowance,in kg/person?
6 A pulp mill clears 27 000 hectares of forest in 15 years. At what rate in hectares/year does themill clear the forest?
7 The cost of 53 litres of petrol is $73.67. Express this cost in c/L.
8 A complaints hotline took 2190 calls in one year. Calculate the number of calls per month.
Divide the number of dollarsby the number of kilograms
See Example 13
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11-07 Best buysOften it is difficult to decide whether you are getting the best value for money. Shoppers compare boththe price and the size of items when they look for the best buy (‘best value for money’). The biggestcontainer does not always provide the best value. The best buy can be found by comparing the unitcost (cost of one item or unit) of each brand or size. A unit could be one gram or one millilitre.
Summary
Unit cost ¼ cost 4 number of items or units
If you look carefully at price tags on supermarket shelves, you will notice unit prices displayed insmall print under the main prices.
Example 14
Which brand of baked beans is the better buy?
$4.60 $1.65
500g 200g
SolutionCalculating the unit cost (cost per gram) for each brand:
Bean There ¼ $4.60 4 500 ¼ $0.0092 / gMr Beanz ¼ $1.65 4 200 ¼ $0.00825 / g
Mr Beanz is the better buy. It has the lower unit cost.
Exercise 11-07 Best buys1 Find the better buy in each pair of items.
a A 2 kg box of sultanas for $8.85 or a 1 kg box for $4.65
b Six DVDs for $15.50 or 8 DVDs for $20
c 45 g chips for $2.10 or 150 g for $6.50
d Two tubs of yoghurt for $1.24 or 7 tubs for $4.30
e 3 kg of corn flour for $5.85 or 500 g of corn flour for $1
f 600 mL bottle of fruit juice for $3.20 or a 2.25 L carton for $8.05
2 Michael purchased 400 g of soccerball ham for $3.59, while Kim purchased 300 g for $2.54.Who got the better buy?
See Example 14
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3 Which size of Fruit Bix cereal is the best buy?
$4.75 $3.49 $2.511kg 750g 375g
4 Happy Tam cat food can be purchased in four different packages.
Pack 1: 24 3 250 g cans for $39.99 Pack 2: 12 3 300 g cans for $24.99Pack 3: 9 3 400 g cans for $25.99 Pack 4: 6 3 1 kg can for $38.50
Which of the following shows the packs ordered from best to worst buy? Select the correctanswer A, B, C or D.
A 4 2 1 3 B 3 2 1 4 C 4 1 2 3 D 2 1 3 4
5 For each item, find which size is the best value for money.
ba
dc
375 g
$1.90
750 g
$3.90
2 L
$3.25 $3.85
375 mL × 6
735 g
$2.78
440 g
$2.21
235 g 175 g115 g
$4.20$3.20
$1.80
6 For each item, which size gives the best value for money?
Small Medium Largea Washing powder 450 g for $3.99 600 g for $5.15 1 kg for $8.95b Margarine 350 g for $4.15 500 g for $5.99 750 g for $8.50c Ice cream 500 mL for $1.39 750 mL for $2.30 2 L for $5.99d Peas 400 g for $2.05 500 g for $2.49 600 g for $2.50
Worked solutions
Exercise 11-07
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Just for the record Unit pricingIn 2009, the Australian Government madeit compulsory for supermarkets to displayunit prices when selling certain groceryitems. Unit pricing means displaying theprice of goods per unit of measure:
• volume: per 100 millilitres• weight: per 100 grams• length: per metre• area: per square metre• for 40 or fewer items: per item• for over 40 items: per 100 items
For example:
MUSHROOM SOUP $2.38ea350g
$0.68/100g
MUSHROOM SOUP $3.20ea500g
$0.64/100g
Which size of mushroom soup is the better buy?
11-08 Rate problemsProblems involving rates can usually be solved by multiplying or dividing. The following strategymay help.
• Write the units of the rate x/y as a fraction: xy
• To find the quantity in the numerator, x, multiply by the rate.• To find the quantity in the denominator, y, divide by the rate.
Example 15
Ben types 55 words per minute. How many words can he type in 20 minutes?
SolutionThe units of the rate expressed as a fraction is words
min.
To find the number of words (the numerator), multiply by the rate.
Number of words ¼ 20 3 55
¼ 1100
Worksheet
Rate problems
MAT08NAWK10104
Puzzle sheet
Rates problems
MAT08NAPS00027
Worksheet
Ratios and rates review
MAT08NAWK00049
No. of minutes 3 words typedper minute
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Example 16
A factory makes pens at the rate of 50 pens per minute.a How many hours and minutes will it take to produce 10 000 pens?b How many pens are produced in an 8-hour day at the factory?
SolutionThe units of the rate expressed as a fraction are
pensmin
.a To find the number of minutes
(the denominator), divide by the rate.
Time taken ¼ 10 000 4 50
¼ 200 minutes
¼ 20060
hours
¼ 3 h 20 min
b To find the number of pens (thenumerator), multiply by the rate.
No. of pens in one hour ¼ 60 3 50
¼ 30001 h ¼ 60 min
No. of pens in 8 hours ¼ 8 3 3000
¼ 24 000
Exercise 11-08 Rate problems1 Marisol is paid $17.80 per hour. How much will she earn if she works 38 hours in a week?
2 A batsman scores at a rate of 32 runs per innings. How many runs will he score in 5 innings?
3 A car uses 14 litres of petrol to travel 147 kilometres. How far can it travel on:
a one litre of petrol? b 20 litres of petrol?
4 A farmer can graze 16 sheep per hectare. If he has 21 hectares set aside for sheep, how manysheep can he graze?
5 A tap drips water at a rate of 18 mL/h. How much water would be wasted in one day?
6 An aeroplane can carry a total of 450 passengers per flight. How many flights will it take tocarry 2 700 passengers?
7 The Wong family needs to buy new carpet for the family home. The carpet costs $125/m andthe carpet layers charge $480 to lay it. How much will it cost to carpet the house if the Wongsneed 28 metres of carpet?
8 A farmer uses fertiliser at a rate of 28 kg/ha. How many hectares can she cover if she has200 kg of fertiliser?
9 Tatiana is paid $17.50/hour to babysit. Find:a how much she earns for babysitting for 4 hours
b how long she babysat to earn $43.75.
Video tutorial
Rate problems
MAT08NAVT10021
How many times 50 dividesinto 10 000
No. of mins 3 pens per min
See Example 15
See Example 16
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10 An aircraft travelled at 900 km/h. How far did it travel in 20 minutes?
11 a Petrol costs $1.35/L. If Rocky had $20 in his pocket, how much petrol could he buy(correct to the nearest 0.1 litre)?
b If Rocky’s car can travel 9 km on one litre of petrol, how far can he travel on the petrol hebought with $20?
12 Smokers lose approximately 3% of their lung capacity per year. If Phil with 100% lungcapacity starts smoking at 20 years of age, at what age will he have 25% lung capacity? Selectthe correct answer A, B, C or D.
A 75 B 28 C 45 D 33
13 The temperature in Mittagong at 7:00 a.m. is 8�C. If the temperature rises at a rate of 3�C/h,find:a the temperature at 10 a.m. and at 2:00 p.m.
b the time at which the temperature will be 23�C.
14 David and Bobby take turns mowing a rectangular lawn 60 m long and 40 m wide.a Find the area of the lawn.
b When David cuts the grass, he does it in one hour using an old lawn mower. What is hismowing rate in m2/min?
c Bobby uses a new lawn mower and it takes him 40 minutes. What is his mowing rate in m2/min?
d How long will it take them to mow the lawn if they mowed together?
15 Jane is filling this tank with a pipe that pumps water at 1.25 litres per second.
6750 L
How long will it take to fill the tank:
a in seconds? b in minutes? c in hours?
16 Kim and Sonya started their holiday on a full tank of petrol. The reading on the odometer (in km)
was 0 3 4 5 6 8 .
When the tank became empty, the reading was 0 3 5 2 1 8 .
Petrol cost $1.54/litre and they needed to pay $73.92 to fill the tank.a How many kilometres did they travel on a full tank of petrol?
b How much petrol is there in a full tank?c How far can their car travel on 1 L of petrol? Answer to the nearest 0.1 km.
11-09 SpeedSpeed is a rate that compares the distance travelled with the time taken. Average speed iscalculated by dividing the distance travelled by the time taken.
Worked solutions
Exercise 11-08
MAT08NAWS10083
Worksheet
What’s my speed?
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Summary
Average speed ¼ distance travelledtime taken
Speed can be measured in kilometres/hour (km/h) ormetres/second (m/s).The relationship between distance, speed and time can beremembered using this triangle.If we cover the quantity we are looking for, the rest of thediagram tells us what to do.
• To find the speed, cover the S and we are left with DT
, so speed ¼ distance 4 time
• To find the distance, cover the D and we are left with S 3 T, so distance ¼ speed 3 time
• To find the time, cover the T and we are left with DS
, so time ¼ distance 4 speed
Example 17
A bullet train travels 320 km in 1 hour 20 minutes.a Calculate its average speed.b How long will it take to travel 1000 km?c How far will it travel in 5 hours?
Solutiona Average speed ¼ distance
time
¼ 320 km1h 20 min
¼ 320 km1 1
3 h
¼ 240 km/h
20 min ¼ 2060
h ¼ 13
h
b Time ¼ distancespeed
¼ 1000240
h
¼ 4 16 h
By the speed triangle, or because we
divide by the rate to find the h in kmh
.
¼ 4 h 10 min Press or DMS on the calculator.
c Distance ¼ speed 3 time
¼ 240 3 5
¼ 1200 km
By the speed triangle, or because we
multiply by the rate to find the km in kmh
.
TS
D
Homework sheet
Rates
MAT08NAHS10014
Puzzle sheet
Speed
MAT08NAPS00024
Worksheet
Speed
MAT08NAWK00045
Animated example
Rates: Triangle method
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Exercise 11-09 Speed1 Find the average speed in km/h for each statement.
a A horse rider travels a distance of 15 km in 3 hours.
b A jet travels 2400 km in 5 hours.
c A bushwalker walks 25 km in 5 hours.
d A cyclist rides 85 km in 5 hours.
e A motorbike travels 250 km in 2.5 hours.
f A car travels 280 km in 3.5 hours.
g A truck travels 390 km in 3 hours and 15 minutes.
h A car travels 90 km in 45 minutes.
i A motorbike on the race track travels 250 km in 1 hour and 15 minutes.
j A boat travels 15 km in 1 hour and 40 minutes.
k An athlete runs 200 m in 20 seconds.
l A kangaroo travels 1.5 km in 15 minutes.
2 Find the average speed in m/s for each statement.a An athlete runs 200 m in 20 seconds.
b A swimmer swims 100 m in 64 seconds.
c A bird flies 348 m in 6 seconds.
d A cyclist travels 960 m in 2 minutes.
e A swimmer swims 1500 m in 16 minutes 40 seconds.
3 A boat travels 24 km in 90 minutes. Which of the following is its average speed? Select thecorrect answer A, B, C or D.
A 12 km/h B 16 km/h C 18 km/h D 36 km/h
4 Peter walked to school in 15 minutes, a distance of 1500 metres. Find his speed in:
a metres per minute b kilometres per hour
5 Mrs Hassam lives 20 kilometres from the nearest railway station and it takes her 30 minutes todrive there in her car. Find her average speed in kilometres per hour.
6 A racing car travels at an average speed of 210 km/h for 2 hours and 20 minutes. How far didit travel? Select the correct answer A, B, C or D.
A 90 km B 294 km C 462 km D 490 km
See Example 17
Quiz
Applying ratios andrates
MAT08NAQZ00007
Worked solutions
Exercise 11-09
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7 Find the distance travelled for each statement.a A car travels for 8 hours at an average speed of 90 km/h.
b A bushwalker travels for 7 hours and 30 minutes at an average speed of 4 km/h.
c A truck travels for 14 hours at an average speed of 95 km/h.
8 Majid can walk at a speed of 6 km/h. How far can he walk in 30 minutes?
9 A bus travels at 75 km/h for 5 hours, and then travels a further distance of 200 km in 4 hours.Find the average speed for the whole journey, correct to one decimal place.
10 A car travels for 3 hours at 60 km/h and then travels a further distance of 100 km at 50 km/h.What is the average speed for the trip?
11 How long does it take a motor scooter to travel 60 km at a speed of 40 km/h?
12 There are other units for measuring speed, such as the knot and the mach. Find what thesespecial terms mean and where they are used.
13 Kieran swims at a speed of 1.85 m/s. What would be his time (to two decimal places) for a100 metre sprint?
14 Sue runs 200 metres in 24 seconds. How far will she run in one minute at the same rate?
15 A flywheel rotates at a rate of 2400 revolutions per minute. How many revolutions does itmake in 30 seconds?
Technology Travelling distances and timesVisit a map website such as WhereIs or Google Maps for this investigation to examine travellingdistances and times between two locations.Harry lives near the Wyong Hill Reserve in NSW and is travelling to the Tuggerah shoppingcentre to see a movie.
1 Use the website to locate both Wyong Hill Reserve and Tuggerah shopping centre, thenfind the travelling distance and time for Harry’s trip if he is going by car.
2 Find the travelling distance and time for Harry’s trip if he is travelling on foot (walking).
3 How much further would you have to travel if you were going from the Wyong Hill Reserveto the shops by car instead of walking there?
4 Would you recommend that Harry travel by car or on foot for the trip? Why?
5 a Calculate the average speed of the car for the trip.
b Why do you think this average speed is slower than the normal speed limit of 60 km/h?
6 Harry is meeting Alinta at Tuggerah to see a movie. Alinta lives in Berkeley Vale. Find thetravelling distance and time for Alinta’s trip if she is travelling by car.
7 If Alinta’s actual driving time was 5 minutes, what was her average speed?
8 If Harry’s actual speed was 80 km/h, how many minutes and seconds will his trip take?
9 So will Harry or Alinta arrive at Tuggerah first? By how minutes and seconds?
Worked solutions
Exercise 11-09
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11-10 Travel graphsA travel graph is a line graph that describes a journey, by comparing distance with time (on thevertical and horizontal axes respectively). The slope or steepness of the graph indicates the speed.
Summary
On a travel graph:
• a horizontal (flat) section on the graph indicates a stop• the steeper the line, the greater the speed (more distance covered in less time)• a section going down, towards the right, indicates a change in direction or that the
traveller is returning towards the start.
Example 18
This graph shows Monique’s cycling trip.
9:00a.m.
10
0
Monique’s cycling trip
Time
Dis
tanc
e fr
om h
ome
(km
)
10:00a.m.
11:00a.m.
12:00noon
1:00p.m.
2:00p.m.
3:00p.m.
4:00p.m.
20
30
40
50
60
70
a At what time did Monique leave home?b When was Monique’s first stop? How far from home was she?c Find her average speed over the first two hours.d What time was it when Monique began her journey home?e How far did she travel all together?f Find her average speed during the trip home.g For how long did Monique stop altogether during the trip?
Puzzle sheet
Jane’s diary
MAT08NAPS10030
Worksheet
Travel graph stories
MAT08NAWK10106
Worksheet
The hare and thetortoise
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Solutiona Monique left home at 9 a.m. At the start of the graph, when distance ¼ 0.b Monique first stopped at 11 a.m., 40 km from home.
This is where the graph is flat.c Distance ¼ 40 km, time ¼ 2 hours
Average speed ¼ 40 km2 h
¼ 20 km/h
d Monique started returning home at 1:30 p.m. This is where the graph points downward.e Monique travelled 65 km, then returned home.
Total distance ¼ 2 3 65 km ¼ 130 kmf Distance ¼ 65 km, time ¼ 2 1
2 hours
Average speed ¼ 65 km2 1
2 h¼ 26 km=h
g First stop: 12 hour. Second stop: 1 hour
Total stopping time ¼ 12þ 1 ¼ 1 1
2hours
Exercise 11-10 Travel graphs1 This travel graph shows Obama’s return trip to his friend Julia’s house.
10:00a.m.
2
0
Obama’s walk
Time
Dis
tanc
e fr
om h
ome
(km
)
11:00a.m.
12:00noon
1:00p.m.
2:00p.m.
3:00p.m.
4:00p.m.
4
6
8
a How long did it take Obama to walk toJulia’s house?
b How far is Julia’s house from Obama’s house?
c Find Obama’s average speed:
i before his first stop ii after his first stop
d How is a higher speed shown on the graph?
e What was the total distance that Obamatravelled?
f Between what times does Obama stop on his walk?
g When did Obama start his trip home?
h How long did it take him to walk home?
2 Merrill drives from Sydney to Canberra, stopping to visit friends in Goulburn.
8:00a.m.
100
0
Merrills’ trip
Time
Dis
tanc
e fr
om h
ome
(km
)
9:00a.m.
10:00a.m.
11:00a.m.
12:00noon
200
300
a How far is Canberra from Sydney?
b How long does the trip take?
c For how long does Merrill stop at Goulburn?
d Find her average speed for the journey (excludingstops).
e How far is it from Goulburn to Canberra?
f When does Merrill travel faster: before or afterGoulburn?
Where the graph is flat, thedistance from home does notchange, which means thatMonique has stopped
See Example 18
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3 This graph shows a cyclist’s day trip.
10:00 a.m. 11:00 a.m. 12:00 noon
4
0
A cycling trip
Time
Dis
tanc
e fr
om h
ome
(km
)
1:00 p.m. 2:00 p.m. 3:00 p.m.
8
12
16
20
24
a At what time did the speed of the cyclist
i increase? ii decrease?
b When did the cyclist start to return home?
c How far did the cyclist travel altogether on this day?
d How long did the cyclist spend ‘on the road’?
e Find the cyclist’s average speed for:
i the first hour ii 11:00 a.m. to 12:15 p.m.iii 12:45 p.m. to 2:00 p.m. iv the entire day
4 Brian travels from Bligh to Macquarie, while Sam travels from Macquarie to Bligh.
8:00 a.m. 9:00 a.m. 10:00 a.m. 11:00 a.m. 12:00 noon 1:00 p.m.
40
Macquarie 0
Brian and Sam’s journey
Time
Dis
tanc
e fr
om M
acqu
arie
(km
)
80
120
160
200
Bligh 240 Brian
Sam
a How far is it between the two towns?
b Who is travelling faster? How can you tell?
Worked solutions
Exercise 11-10
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c How far is Brian from Macquarie at 11 a.m.?
d How far is Sam from Macquarie at 11 a.m.?
e At what time do Brian and Sam pass each other? How far are they from Macquarie whenthey pass?
f Is Sam travelling faster before 9 a.m. or after 9:15 a.m.? How does the graph show this?
g Calculate Brian’s average speed before he stops.
h For how long did Sam stop altogether on the trip? Select the correct answer A, B, C or D.
A 60 minutes B 75 minutes C 5 minutes D 90 minutes
5 James travelled from Darwin to Alice Springs as shown in the graph below.
200
0
James’ journey from Darwin to Alice Springs
Time
Kilo
met
res
from
Dar
win
400
600
800
1000
1200
1400
1600
6:00a.m.
7:00a.m.
8:00a.m.
9:00a.m.
10:00a.m.
11:00a.m.
12:00noon
1:00p.m.
2:00p.m.
3:00p.m.
4:00p.m.
5:00p.m.
6:00p.m.
7:00p.m.
a How far is Alice Springs from Darwin?
b When did James arrive in Alice Springs?
c What was James’ average speed in the last two hours?
d Which of the following statements is false? Select the correct answer A, B, C or D.A James stopped for 4 hours altogether.
B James was travelling fastest in the last two hours.
C James’ speed for the first 4 hours was 100 km/h.
D James’ average speed for the whole trip was 120 km/h.
e Samantha leaves Darwin one hour after James and travels at a constant speed of 125 km/htowards Alice Springs. Copy the graph and add Samantha’s journey to it.
f Find the approximate time when Samantha overtakes James.
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6 This travel graph shows Marnie’s cycling journey. Write a story about her ride, based on theinformation in the graph.
20
40
60
80
100
0
Time (hours)1 2 3 4 5 6
Dis
tanc
e (k
m)
Marnie’s journey
7 Match each bushwalker described below with the correct travel graph.
Time (hours)
Dis
tanc
e (k
m)
Bushwalking trips
B
AD
C
a Santosh maintained the same speed all day.
b Michelle was fast at first, but slowed down.
c Tahlia was the fastest, but then got slower after stopping for lunch.
d Jim was slow at first, but picked up speed.
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8 Which one of the graphs below could not be a travel graph? Select the correct answer A, B, Cor D. Why not?
tTime
a b
c d
Distance
tTime
Distance
tTime
Distance
tTime
Distance
11-11 Sketching informal graphsLine graphs are useful because they provide a visual picture of the relationship between twovariables, for example, distance and time. For many situations or events, the rates of change arenot constant, so graphs of these situations or events are more likely to be informal and involvecurves rather than straight lines.
Example 19
Draw a graph to represent a bath’s water level over time.
• Harry switches on the tap and the water level gradually rises.• Harry switches off the tap, gets into the bath and the water level quickly rises.• Harry stays in the bath for a while before climbing out, reducing the water level again.• Harry unplugs the bath and it drains completely: the water level decreasing quickly at
first, then slowly towards the end.
SolutionThe horizontal axis should represent Time.The vertical axis should represent Height of water.
Bath’s water level
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Exercise 11-11 Sketching informal graphs1 The lift in a six-storey building started at the ground floor, went to the second floor, then the
fifth floor, then the third floor, before returning to ground floor. Which of the followinggraphs represents this situation? Select the correct answer A, B, C or D.
6
5
4
3
2
1
Floor
Time(min)1
Ground32 4
A6
5
4
3
2
1
Floor
Time(min)1
Ground32 4
B
6
5
4
3
2
1
Floor
Time(min)1
Ground32 4
C6
5
4
3
2
1
Floor
Time(min)1
Ground32 4
D
2 A triathlete has the following training program for a marathon.
• Start at 5 a.m., run 12 km in 2 hours, rest 12 hour.
• Run a further 8 km in the next hour, rest 12 hour.
• Pick up bike and cycle home, arriving at 10 a.m.
Draw the graph of this training session.
See Example 19
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3 Make up a story to describe the changes in temperature over a day as shown on this graph.
Temperature(°C)
06 a.m. 9 a.m. 3 p.m. 6 p.m. 9 p.m. 12 midnight12 noon
5
10
15
20
15
30
35
40
Time(h)
4 Match each Year 8 class to the graph of its noise level.
• 8 Green is constantly noisy.• 8 Yellow is quiet until the teacher leaves the room.• 8 Brown is regularly told to be quiet by their teacher.• 8 Red just gets louder and louder.
aNoiselevel
Time
bNoiselevel
Time
cNoiselevel
Time
dNoiselevel
Time
5 Sketch a graph of the noise level of this classroom.
• The students enter the classroom and the noise level increases.• They settle down and work quietly.• There are small group discussions and then the teacher talks.• Towards the end of the lesson the noise level increases.• Then the teacher speaks about the homework for the night and the class is dismissed.
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6 Grandad likes watching basketball but during a match his level of excitement (measured by hisheartbeat rate) can reach dangerous levels, as shown by the graph below.
Quartertime
0
Dan
ger
leve
l
Three-quartertime
Gameover
Half-time
Time(min)
a Describe Grandad’s excitement level in the first quarter.
b How many times does he become too excited during the match?
c What happens to his excitement level after the match?
d Describe what might have happened in the final quarter to make him so excited.
7 A cup of tea sits on the kitchen bench cooling. At first it loses heat quickly but as time passes itloses heat more slowly until it reaches room temperature. Which graph below best illustratesthis? Select the correct answer A, B, C or D.
Time
Tem
pera
ture
a
Time
Tem
pera
ture
b
Time
Tem
pera
ture
c
Time
Tem
pera
ture
d
8 Sketch a graph to represent each situation.a The temperature in your town over a 24-hour period.
b The volume of petrol in a car. It is filled up, then runs for a while, stops for some time andthen continues the trip.
c The height of a plane travelling from Sydney to London with a refuelling stop in Dubai.
d The number of cans of drink in a vending machine if it is filled in the morning and in theafternoon.
e Your hunger level over a day during your waking hours.
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11-12 Time differences
Example 20
What is the difference in time between 8:35 a.m. and 3:10 p.m.?
SolutionMethod 1
8:35 a.m.
+ 6 h
3:10 p.m.
+ 10 min
3 p.m.9 a.m.
25 min
From 8:35 a.m. to 9:00 a.m. ¼ 25 minutesFrom 9:00 a.m. to 3:00 p.m. ¼ 6 hoursFrom 3:00 p.m. to 3:10 p.m. ¼ 10 minutes
Total time difference ¼ 6 hþ 25 minþ 10 min
¼ 6 h 35 min
Method 2Convert to 24-hour time first, then use the calculator’s or DMS key to subtract thetimes.Time difference ¼ 3:10 p.m. � 8:35 a.m.
¼ 1510� 0835
¼ 6 h 35 min15 10 − 8 35 = .
Example 21
Find 7 h 5 min � 3 h 24 min.
Solution7 h 5 min� 3 h 24 min ¼ 7� 3ð Þhþ 5� 24ð Þmin
¼ 4 hþ �19ð Þmin
¼ 3 h 60� 19ð Þmin
¼ 3 h 41 min
OR On a calculator, enter 7 5 − 3 24 =
Worksheet
Time calculations
MAT08MGWK10107
Video tutorial
Time differences
MAT08MGVT10022
Homework sheet
Travel graphs and time
MAT08NAHS10015
Skillsheet
Units of time
MAT08MGSS10038
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Example 22
What is the time 3 hours 20 minutes after 10:42 p.m.?
Solution
10:42 p.m.
+ 3 h
1:42 a.m. 02:02 a.m.
+ 18 min + 2 min
2:00 a.m.
3 hours after 10:42 p.m. is 1:42 a.m.20 minutes after 1:42 a.m. is 2:02 a.m.
Exercise 11-12 Time differences1 What is the difference in time between 11:42 a.m. and 2:13 p.m.? Select the correct answer A,
B, C or D.
A 2 h 31 min B 3 h 55 min C 7 h 29 min D 11 h 55 min
2 Calculate the time difference between each pair of times.
a 6:15 p.m. and 8:10 p.m. b 11:16 a.m. and 12:06 p.m. c 4:10 a.m. and 8:55 a.m.d 11:25 p.m. and 3:20 a.m. e 0725 and 1310 f 2120 and 0815g 4:10 a.m. and 12:15 p.m. h 0940 and 1310 i 1245 and 1725
3 Simplify each expression.
a 2 h 15 min þ 4 h 32 min b 3 h 25 min þ 8 h 27 minc 6 h 42 min � 3 h 13 min d 12 h 37 min � 5 h 6 mine 7 h 12 min þ 5 h 18 min f 1 h 42 min þ 6 h 27 ming 15 h 57 min � 9 h 48 min h 6 h 2 min � 4 h 17 mini 9 h 37 min þ 2 h 52 min j 4 h 49 min þ 7 h 18 mink 8 h 18 min � 3 h 27 min l 5 h 31 min � 3 h 48 min
4 A film starts at 3:14 p.m. and ends at 5:09 p.m. How long is the film?
5 What time will it be:
a 6 hours after 2:00 p.m.? b 3 hours after 10:00 a.m.?c 20 minutes after 7:15 p.m.? d 2 hours 32 minutes after 10:45 a.m.?e 3 hours 29 minutes after 10:35 p.m.? f 5 hours after 9:32 a.m.?g 9 hours after 6:17 p.m.? h 55 minutes after 3:30 p.m.?i 4 1
4 hours after 4:30 a.m.? j 5 hours and 25 minutes after 9:45 a.m.?
6 A car rally began at 8:20 a.m. Here are some of the cars and the times they ran. Write the carsin their order of finishing and the time each crossed the finishing line.
Toyota 6:21 (6 h 21 min) Volvo 5:23 Ford 5:44Nissan 6:01 Subaru 5:59 Peugeot 5:42
See Example 20
Skillsheet
24-hour time
MAT08MGSS10039
See Example 21
See Example 22
Worked solutions
Exercise 11-12
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7 This timetable is part of a schedule for a bus travelling between Sydney and Wagga Wagga.
Sydney to Wagga Wagga Wagga Wagga to SydneySydney 2:30 p.m. Wagga Wagga 7:15 a.m.Strathfield 3:00 p.m. Gundagai 8:25 a.m.Yagoona 3:20 p.m. Jugiong 8:54 a.m.Liverpool 3:45 p.m. Yass 9:41 a.m.Mittagong 4:40 p.m. Goulburn* 10:41 a.m.Goulburn* 5:40 p.m. Mittagong 12:10 p.m.Yass 7:10 p.m. Liverpool 1:05 p.m.Jugiong 7:55 p.m. Yagoona 1:20 p.m.Gundagai 8:20 p.m. Strathfield 1:35 p.m.Wagga Wagga 9:30 p.m. Sydney 2:05 p.m.*30 minute meal stop at Goulburn
a How long does the trip from Sydney to Wagga Wagga take?
b How long would the trip take without a meal break?
c Ali joins the return bus at Jugiong and gets off at Liverpool. How long is his trip?
d Find the time taken from Liverpool to Sydney, and from Sydney to Liverpool on the returntrip. Suggest a reason for the difference.
e At what time does the bus from Wagga Wagga arrive in Goulburn?
f Where is the return bus at 1:35 p.m.?
g Chris is waiting at Yagoona at 2:45 p.m. for the bus to Mittagong. How long will he have towait before the bus arrives and when will he reach Mittagong?
8 This is part of the ferry timetable for Woy Woy to Empire Bay.
MONDAY TO FRIDAY
FERRY DEPARTS FROM WOY WOYDEPARTS SARATOGA DAVISTOWN ARRIVESWoy Woy Veterans Hall Lintern St. Central (RSL) Pine Av. Empire Bay6:35am 6:45am 6:50am 7:00am - -7:45am 7:55am 8:00am 8:10am 8:10am 8:15am9:00am 9:10am 9:15am 9:25am 9:25am 9:30am10:45am 10:55am 11:00am 11:10am 11:10am 11:15am12:30pm 12:40pm 12:45pm 12:55pm 12:55pm 1:00pm1:50pm 2:00pm 2:05pm 2:15pm 2:15pm 2:20pm3:30pm 3:40pm 3:45pm - - -4:50pm 5:00pm 5:05pm 5:15pm - -5:50pm 6:00pm 6:05pm 6:15pm - -6:50pm 7:00pm 7:05pm 7:15pm 7:15pm 7:20pm
a How many trips from Woy Woy arrive at Empire Bay each weekday?
b If George catches the 7:45 a.m. ferry from Woy Woy, at what time will he arrive at Empire Bay?
c If Sally catches the 2:05 p.m. ferry from Lintern St, where will she be at 2:15 p.m.?
d Joe needs to be at Central (RSL) before 10:00 a.m. What is the latest ferry he can catchfrom Saratoga to be there on time?
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e How long does it take to travel from Saratoga to Empire Bay?
f At what time does the last bus leave Woy Woy in the evening?
g Suppose a new ferry service departs Woy Woy at 11:15 a.m. What time should it arrive atPine Avenue?
11-13 International time zonesThe world is divided into 24 hourly time zones. Time is the same throughout each zone. Thecentre of each time zone is a meridian of longitude (an imaginary line running from the North Poleto the South Pole). Each hourly time zone covers 15� of longitude.
180°W 0°90°W 30°W 30°E60°W150°W 120°W 60°E 90°E 120°E 150°E 180°E
International Date L
ine
International Date L
ine
Greenw
ich Meridian
N
Rio deJaneiro
Honolulu
San FranciscoNew York
GreenwichGeneva
Moscow
Beijing
Hong
PerthSydney
Equator
Kong
West of Greenwich East of Greenwich
12:00 12:006:00am 10:00am 2:00pm8:00am2:00am 4:00am 4:00pm 6:00pm 8:00pm 10:00pm 12:00
Greenw
ich Meridian
80°
60°
40°
20°
0°
20°
40°
60°
midnight noonUTC
midnight
Helsinki
Athens
Ottawa
(behind GMT) (ahead of GMT)
The map above shows how times around the world are related. All time is measured in relation tothe time at the Greenwich Observatory (in London), either ahead or behind UTC (CoordinatedUniversal Time), also known as Greenwich Mean Time (GMT). Greenwich is pronounced‘Grennitch’. Time zones in Australia are ahead of UTC because Australia is east of Greenwich. Timezones in the USA are behind UTC because the USA is west of Greenwich.
NSW
Worksheet
World time zones
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Chapter 1 2 3 4 5 6 7 8 9 10 11 12
Ratios, rates and time
Exercise 11-13 International time zones1 Use the map above to determine whether each city is ahead of or behind UTC.
a Sydney b Auckland c Rio de Janeiro d Perthe Beijing f Honolulu g Moscow h Athensi Hong Kong j Helsinki k New York l Ottawa
2 Find the time in each city when it is noon in Greenwich.
a Sydney b Perth c New York d Beijinge San Francisco f Honolulu g Moscow h Geneva
3 What is the time difference between:
a Sydney and Perth? b Sydney and Beijing?c Sydney and Honolulu? d Sydney and Moscow?e Sydney and New York? f Perth and Beijing?g San Francisco and New York? h Honolulu and Moscow?i Geneva and Perth? j San Francisco and Geneva?
4 If it is 2:00 p.m. in Sydney, what is the time in:
a Greenwich? b Perth? c New York? d Beijing?e San Francisco? f Honolulu? g Moscow? h Geneva?
5 A cricket match being played in India is telecast live at 7:00 p.m. Sydney time. What is thelocal time of the cricket match if Sydney’s time is 4 1
2 hours ahead of India’s?
6 Simone, in Newcastle (NSW), wants to use the Internet to chat with her cousin Zac inVancouver, Canada. The time in Vancouver is 18 hours behind the time in Newcastle. At whattime should Simone log on to the Internet to catch Zac when it is 3:00 p.m. in Vancouver?
7 Brisbane is 2 hours behind Auckland. A plane leaves Auckland at midday and takes3 hours to fly to Brisbane. What is the local time in Brisbane when the plane lands? Select thecorrect answer A, B, C or D.
A 11 a.m. B 1 p.m. C 3 p.m. D 5 p.m.
8 Find out what happens if you cross the International Date Line (IDL). Why isn’t the IDL straight?
9 This map shows the three time zones for Australia.
NorthernTerritory
QueenslandWesternAustralia
SouthAustralia
New SouthWales
Victoria
Tasmania
Australian Western Standard Time
(AWST)
Australian Eastern Standard Time
(AEST)
−2 hours10 a.m. 11:30 a.m. 12 noon
− hour12 Zero
Australian Central Standard Time
(ACST)
Worked solutions
Exercise 11-13
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State whether each city is ahead of, behind or has the same time as Adelaide (SA).
a Sydney b Melbourne c Darwind Perth e Mt Isa (Qld) f Geraldton (WA)g Cobar (NSW) h Ceduna (SA) i Cairns (Qld)
10 What is the time difference between:
a Sydney and Adelaide? b Melbourne and Perth? c Adelaide and Melbourne?d Hobart and Darwin? e Canberra and Perth? f Brisbane and Canberra?
11 If it is 11 p.m. in Sydney, what time is it in:
a Melbourne? b Adelaide? c Perth?d Darwin? e Hobart? f Canberra?
12 If it is 11:30 p.m. in Adelaide, what time is it in:
a Melbourne? b Sydney? c Perth?d Darwin? e Hobart? f Brisbane?
13 a Joe flies from Sydney to Perth, taking 4 hours. If he leaves Sydney at 2 p.m., at what timedoes he land in Perth? Give your answer as Perth local time.
b When Joe flies home, he leaves Perth at 9 a.m. At what time does he land in Sydney? Giveyour answer as Sydney local time.
14 a Find out when daylight saving begins and ends.
b Why do we have daylight saving?
c How does daylight saving affect the different time zones?
d If it is 12:30 p.m. in Western Australia (not on daylight saving), what time is it in NewSouth Wales on Eastern Standard Daylight Saving Time?
Investigation: World trip
Plan a trip around the world with at least three stopovers (for example, Tokyo, Hanoi,Cairo). Use airline timetables so you can give details of departures, arrivals and the lengthof each flight. Does it matter if you head east or west when you start? What affect does theInternational Date Line have on your trip?
Worked solutions
Exercise 11-13
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Ratios, rates and time
Power plus
1 Australia’s annual birth rate in 2011 was approximately 12 per 1000. Given that its populationthen was 22 750 000, approximately how many babies were born in Australia in 2011?
2 a Singapore has a population of 5 180 000. The population density of Singapore is 7358persons/km2. What is the area of this very crowded country?
b Australia’s population density is only 3.0 persons/km2. The area of Australia is 7 682 300km2. If Australia was populated as densely as Singapore, what would its population be?
3 A spider moves at 1 cm/s. If the spider is in the back left-hand corner of your classroom,find how long (in minutes) it will take to reach:
a the nearest person b you c the teacher’s desk
4 Convert each speed to km/h. (Round your answers to two decimal places.)
a An African cheetah runs at 27 m/s.b A German peregrine falcon dives at 97 m/s.c A Tanzanian snake travels at 3.3 m/s.d A racing cyclist rides at 23 m/s.
5 Work out a formula for converting speed expressed as x m/s to y km/h.
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Chapter 11 review
n Language of maths
best buydaylight savingdistancedivideequivalentInternational
Date Line
km/hmapper (/)planrateratio
scaled lengthscale ratiosimplifyspeedstationaryterm
time zonetravel graphunitary methodunit costUTC (Coordinated
Universal Time)
1 When comparing the prices and sizes of items to find the best buy, do we look for thehighest or lowest unit cost?
2 What type of measurement compares quantities of different types, expressed using two units?3 What is meant by the scale ratio of a map or plan?4 What does an average speed of 65 km/h actually mean?5 How is a change in speed shown on a travel graph?6 In which country is the UTC or GMT time zone?
n Topic overview
• Give examples of places in which ratios, rates and time are used.• What did you learn in this chapter?• What did you find most difficult about this topic? Discuss any problems with your teacher or
with a friend.
Copy and complete this mind map of the topic, adding detail to its branches and using pictures,symbols and colour where needed. Ask your teacher to check your work.
Pigment A
Pigm
ent B
:
RATIOS
RATES
0
20
4060
80 100120
140
160
180
km/h
TIME
TRAVELGRAPHS
Ratios, rates andtime
Distance
Time
Puzzle sheet
Ratios, rates and timefind-a-word
MAT08NAPS10031
Worksheet
Mind map: Ratios, ratesand time
MAT08NAWK10109
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1 Copy and complete each pair of equivalent ratios.
a 1 : 3 ¼ 4 : ____ b 2 : 5 ¼ 6 : ____ c 3 : 7 ¼ ____ : 21d 4 : 9 ¼ ____ : 45 e 0.5 : 0.8 ¼ 2 : ____ f 3 : 4 : 5 ¼ ____ : 20 : ____
2 Simplify each ratio.
a 12 : 21 b 25 : 75 c 6 : 36d 25 : 45 e 18 : 6 : 24 f 5 : 25 : 100
g 13
:12
h 34
:916
i 1 12 : 2 1
2
j 0.98 : 0.245 k 1.5 : 6 l 91 : 5.6m 5 km : 200 metres n 20 kg : 3600 g o $25 : $4.25p 18 months : 4 years q 10 days : 5 weeks r 8 h : 3 days
3 a The ratio of girls to boys in Year 8 is 4 : 3. If there are 75 boys in Year 8, find how manygirls there are.
b Donald and Evelyn invested in a business in the ratio 5 : 7. If Evelyn invested $63 000,how much did Donald invest?
4 Measure the length of each scale drawing below, and then use the ratio to work out the actuallength of the object shown.
a Fish b Frog
Scale 1 : 10 Scale 1 : 4
5 On a tourist map of Sydney, the scale is given by 0 500 m.a Write this scale as a simplified ratio.b Find the actual distance between the following places given the scaled distance.
i Circular Quay station to the Opera House (2.5 cm)ii Pyrmont Bridge to Parliament House (4.4 cm)
c Find the scaled distance between the following places given the actual distance.i Art Gallery of NSW to Sydney Tower (875 m)ii Circular Quay station to Central station (2.5 km)
6 Ellen and Portia share the weekly rent of $420 on their apartment in the ratio 4 : 3.How much does each woman pay?
7 Write each statement as a rate in simplified form.
a $10.50 for 3 kg b 220 km in 2 hoursc $56.40 for 4 hours d 260 runs in 50 overs
See Exercise 11-01
See Exercise 11-02
See Exercise 11-03
See Exercise 11-04
See Exercise 11-04
See Exercise 11-05
See Exercise 11-06
4599780170189538
Chapter 11 revision
8 For each pair, determine which is the better buy.a A 1 kg box of biscuits for $5.60 or a 700 g carton for $4.00.b A 350 g can of soup for $4.20 or a 550 g can for $7.15.c A 1.5 L bottle of lemonade for $2.45 or a 375 mL can for $0.70.d 3 3 40 g chocolate bars for $2.36 or a 500g chocolate bar for $9.
9 a Mince is $3.99/kg. How much does 5 kg of mince cost?b Dean earns $18.70/h. How much is she paid for 38 hours work?c How many litres of petrol can you buy with $40 if petrol costs $1.35/L? Answer to the
nearest 0.1 L.d Fertiliser is used at 20 kg/ha. How many hectares can be covered with 144 kg of fertiliser?
10 Find the speed, in km/h, of a cyclist who travels a distance of 45 km in 2 hours and15 minutes.
11 Find the distance covered by a truck that travels for 5 hours and 30 minutes at anaverage speed of 45 km/h.
12 Keith and Kent decided to gobushwalking. This travel graphshows their walk.
10:00a.m.
2
0
Keith and Kent’s bushwalk
Time
Dis
tanc
e fr
om c
amp
(km
)
11:00a.m.
12:00noon
1:00p.m.
2:00p.m.
3:00p.m.
4:00p.m.
5:00p.m.
6:00p.m.
4
6
8
10a How far did they travel
from camp?b How many stops did they make?c Find their average speed between
their first and second stops.d How long did it take them to
return home?e Between what times were they
walking fastest?
13 Match each description to its correct graph.a The water level of the bath stayed constant at 50 cm.b The bath was filled at a steady rate. The tap was turned off to let the hot bathwater cool.
The rest of the bath was filled with cold water.c The bath was filled with warm water at a steady rate.
Time
Wat
er le
vel
Wat
er le
vel
Wat
er le
vel
Time Time
a b c
See Exercise 11-07
See Exercise 11-08
See Exercise 11-09
See Exercise 11-09
See Exercise 11-10
See Exercise 11-11
460 9780170189538
Chapter 11 revision
14 Draw a graph to represent the following story. ‘The weight of the baby elephant increasedquickly at first but then slowed down to a steady rate.’
15 What is the time:
a 3 hours and 20 minutes after 8:05 p.m.? b 4 hours and 45 minutes before 11:15 p.m.?
16 Calculate the time difference between each pair of times.
a 10:10 a.m. and 6:40 p.m. b 12:05 p.m. and 3:20 a.m.c 1230 and 2320
17 A section of a bus timetable is shown below.
Mudgee East Loop
Weekdays (Monday to Friday)
pmam
560560560560
10.02
Loo
k fo
rbu
s nu
mbe
rs
11.402.394.15
10.0311.412.404.16
10.0411.422.414.17
10.0811.462.454.21
10.1111.492.484.24
10.1311.51
2.504.26
10.1611.54
2.534.29
10.1011.56
2.554.31
10.2011.58
2.574.33
10.2212.00
2.594.35
10.2312.01
3.004.36
10.2712.05
3.044.40
10.3012.08
3.074.43
B C J P Q R U V W X CA AMorti
mer Cen
tre
Mortimer
Centre
Coles S
upermark
et
Clock T
ower
Hospita
l
Church St
Sprin
g St &
Robert
son St
Robert
son St
&
Lions D
rLion
s Dr &
Sydney
Rd
Sydney
Rd &
Industr
ial A
ve
Horati
o St &
Lawso
n St
Cedar
Ave &
Mulgo
a Way
Clock T
ower
Mad
eira R
d &
Bawden
Rd
a What do you think the shaded area represents?b How many bus services run each day?c How long is the journey from the Mortimer Centre to Robertson St?d Tom catches the bus from Spring St at 2:48 p.m. Where does the bus stop after 11
minutes?e Mary needs to meet a friend at the Clock Tower at 3:10 p.m. Which is the latest bus she
can catch from Madeira Rd to be there on time?
18 Use the world map on page 454 to find the time difference between:a Sydney and Athens b Sydney and Hong Kongc Perth and Honolulu d San Francisco and Helsinki
19 An international hockey match in Holland is played at 3:30 p.m. local time. At what timeshould Shegufta wake up to watch the game live on TV in Sydney if Sydney’s time is 8 hoursahead of Holland’s?
See Exercise 11-11
See Exercise 11-12
See Exercise 11-12
See Exercise 11-12
See Exercise 11-13
See Exercise 11-13
4619780170189538
Chapter 11 revision
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